Asked by Cabbage Celie
List the angles of β³TAG
β³
π
π΄
πΊ
in order from largest to smallest if AT=12.5
π΄
π
=
12.5
, GT=15.2
πΊ
π
=
15.2
, and AG=25.1
π΄
πΊ
=
25.1
.(1 point)
Responses
β A
β
π΄
, β T
β
π
, β G
β
πΊ
angle upper A , angle upper T , angle upper G
β G
β
πΊ
, β A
β
π΄
, β T
β
π
angle upper G , angle upper A , angle upper T
β T
β
π
, β A
β
π΄
, β G
β
πΊ
angle upper T , angle upper A , angle upper G
β T
β
π
, β G
β
πΊ
, β A
β³
π
π΄
πΊ
in order from largest to smallest if AT=12.5
π΄
π
=
12.5
, GT=15.2
πΊ
π
=
15.2
, and AG=25.1
π΄
πΊ
=
25.1
.(1 point)
Responses
β A
β
π΄
, β T
β
π
, β G
β
πΊ
angle upper A , angle upper T , angle upper G
β G
β
πΊ
, β A
β
π΄
, β T
β
π
angle upper G , angle upper A , angle upper T
β T
β
π
, β A
β
π΄
, β G
β
πΊ
angle upper T , angle upper A , angle upper G
β T
β
π
, β G
β
πΊ
, β A
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine the order of the angles in triangle \( \triangle TAG \) from largest to smallest based on the given side lengths, we can use the fact that in a triangle, the angle opposite the longest side is the largest, and the angle opposite the shortest side is the smallest.
The sides given are:
- \( AT = 12.5 \)
- \( GT = 15.2 \)
- \( AG = 25.1 \)
Now, let's identify which angle corresponds to which side:
- \( AG \) (25.1) is the longest side, which means \( \angle T \) is the largest angle.
- \( GT \) (15.2) is the second longest side, which means \( \angle A \) is the second largest angle.
- \( AT \) (12.5) is the shortest side, which means \( \angle G \) is the smallest angle.
Based on this, the order of the angles from largest to smallest is:
1. \( \angle T \)
2. \( \angle A \)
3. \( \angle G \)
The correct response is:
**β T, β A, β G** (angle upper T, angle upper A, angle upper G).
The sides given are:
- \( AT = 12.5 \)
- \( GT = 15.2 \)
- \( AG = 25.1 \)
Now, let's identify which angle corresponds to which side:
- \( AG \) (25.1) is the longest side, which means \( \angle T \) is the largest angle.
- \( GT \) (15.2) is the second longest side, which means \( \angle A \) is the second largest angle.
- \( AT \) (12.5) is the shortest side, which means \( \angle G \) is the smallest angle.
Based on this, the order of the angles from largest to smallest is:
1. \( \angle T \)
2. \( \angle A \)
3. \( \angle G \)
The correct response is:
**β T, β A, β G** (angle upper T, angle upper A, angle upper G).
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